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Math 170 Exam 2 Review Problems June 23, 2016 1) It is given to you that 116 ≡ 4 mod 43. Find the remainder when 1119 is divided by 43. Ans: We know that if a ≡ b mod m, then an ≡ bn mod m for any natural number n. Additionally c · a ≡ c · b mod m for any integer c. As 116 ≡ 4 mod 43, we have that (116 )3 ≡ 43 mod 43 ⇒ 1118 ≡ 64 ≡ 21 mod 43. Multiplying 11 to both sides, we see that 1119 ≡ 11 × 21(= 231) ≡ 16 mod 43. Thus the remainder is 16. 2) It is given to you that 116 ≡ 4 mod 43. Find the remainder when 1190 is divided by 43. Ans: As 43 is a prime number and 11 is not divisible by 43, by Fermat’s little theorem we have that 1142 (= 11(43−1) ) ≡ 1 mod 43. Thus 1184 (= (1142 )2 ) ≡ 1 mod 43 ⇒ 116 × 1184 ≡ 116 × 1 mod 43 ⇒ 1190 ≡ 116 ≡ 4 mod 43. Thus the remainder is 4. 3) Find the remainder when 350 is divided by 15. Ans: We will explore two ways of doing this. a) 33 (= 27) ≡ −3 mod 15 ⇒ 36 (= (33 )2 ) ≡ (−3)2 ≡ 32 mod 15. We repeatedly use the fact that 36 ≡ 32 mod 15 by taking suitable powers. If we cube both sides, we get 318 ≡ 36 ≡ 32 mod 15. Next, we square both sides of the previous equation to get 336 ≡ 34 mod 15. Multiply 31 4 on both sides to get 350 ≡ 318 mod 15. But we already know from our previous calculations that 318 ≡ 32 mod 15. Thus 350 leaves a remainder of 32 = 9 when divided by 15. b) 15 = 3 × 5. Clearly 350 is divisible by 3. By Fermat’s little theorem, 34 ≡ 1 mod 5. Taking the 12th power on both sides, we get 348 ≡ 1 mod 5. Thus 350 ≡ 32 ≡ 4 mod 5. The remainder modulo 15 must also leave the same remainders as 350 when divided by 3, and 5. Then we must answer the following question : Find r such that 0 ≤ r < 15, and 3 divides r and r leaves a remainder of 4 when divided by 5. The possible choices for r from the second condition are 4, 9, 14. Only one of them is divisible by 3 i.e. 9 which is the answer we are looking for. 4) Find a natural number x such that 11x leaves a remainder of 1 when divided by 25. Ans: We want to solve 11x ≡ 1 mod 25. In other words, we want to find the ¯ in the class of remainders modulo 25. First of all, multiplicative inverse of 11 it is necessary that 11 and 25 be coprime for a multiplicative inverse to exist. Let’s use the Euclidean division algorithm to compute the GCD of 11 and 25. 25 = 11 × 2 + 3, 1 Math 170 Exam 2 Review Problems June 23, 2016 11 = 3 × 3 + 2, 3 = 2 × 1 + 1. Thus the GCD of 11 and 25 is 1 i.e. they are coprime. We trace the steps backwards to find integers m, n such that 25m + 11n = 1. 3 − 2 = 1 ⇒ 3 − (11 − 3 × 3) = 1 ⇒ 3 × 4 − 11 = 1 ⇒ (25 − 11 × 2) × 4 − 11 = 1 ⇒ 25 × 4 + 11 × (−9) = 1. From the equation 25 × 4 + 11 × (−9) = 1, we note that when divided by 25, 11 × −9 leaves a remainder of 1. Thus −9 or 25 + (−9) = 16 is the inverse of 11 modulo 25. We can check by noting that 11 × 16 = 176 leaves a remainder of 1 when divided by 25. Thus x = 16 is one possible answer. (any natural number in the remainder class of 16 is an answer. For instance 25 + 16(−41), 50 + 16(= 66), 75 + 16(= 91),etc.) 5) Find the last two digits of 13150 . Ans: The last two digits of 13150 is equal to the remainder r when it is divided by 100. As 100 = 25 × 4, 13100 and r leave the same remainders when divided by 25, and 4. So we try to compute 13150 mod 25 and 13150 mod 4 instead. 13 ≡ 1 mod 4. Thus 13150 ≡ 1150 ≡ 1 mod 4. 132 ≡ 19 ≡ −6 mod 25. Squaring both sides, we get 134 ≡ 36 ≡ 11 mod 25 ⇒ 138 ≡ 112 ≡ 21 ≡ −4 mod 25 ⇒ 1316 ≡ (−4)2 ≡ 16 mod 25. Thus 134 × 1316 ≡ 11 × 16 ≡ 1 mod 25. Once we have 1320 ≡ 1 mod 25, by taking 7th power on both sides, we get 13140 ≡ 1 mod 25. This implies that 13150 ≡ 1310 mod 25. Also using our previous calulations, we get 1310 = 138 × 132 ≡ (−4) × (−6) ≡ 24 mod 25. We conclude that 13150 ≡ 24 mod 25. Thus we also have that r ≡ 1 mod 4 and r ≡ 24 mod 25. As 0 ≤ r < 100, from the second part, we have that r must be one of the following: 24, 49, 74, 99. Only one of the above numbers, 49, leaves remainder 1 when divided by 4. Thus r = 49. 6) For a RSA cipher, if the two primes are p = 17, q = 19, find two valid candidates for e (encoding power) and d (decoding power) such that neither of them is equal to 1. (In other words, find non-trivial ones.) Ans: Our encoding power, e, must be co-prime to (p − 1)(q − 1) = (17 − 1) × (19 − 1) = 16 × 18 = 288. We choose e = 7. The decoding power d has the property that e · d leaves a remainder of 1 when divided by m = (p − 1)(q − 1). So, we need to find the multiplicative inverse of 7 modulo 288. 288 = 7 × 41 + 1. Thus the multiplicative inverse of 7 is 288 + (−41) = 247. Thus we have d = 247 as the decoding power. 7) We have a RSA cipher based on the two primes p = 5, q = 7 and e = 11. If A → 01.B → 02, · · · , Z → 26, what is the encrypted version of the message “EXAM”? (Note that the encrypted version is a string of numbers all of which are less than 35.) 2 Math 170 Exam 2 Review Problems June 23, 2016 Ans: EXAM → 05 24 01 13. We use the encoding power (11) to raise the numbers to the power 11 and store the remainders modulo p · q = 5 × 7 = 35. E translates as 511 mod 35. 52 ≡ −10 mod 35 ⇒ 54 ≡ (−10)2 ≡ −5 mod 35 ⇒ 58 ≡ (−5)2 ≡ 52 mod 35 ⇒ 52 × 58 = 510 ≡ 52 × 52 ≡ 54 ≡ −5 mod 35 ⇒ 511 ≡ 5 × −5 ≡ 10 mod 35. Thus the encoding of E is 10. X translates as 2411 mod 35. 24 ≡ −11 mod 35 ⇒ 242 ≡ (−11)2 ≡ 121 ≡ 16 mod 35 ⇒ 244 ≡ 162 ≡ 11 mod 35 ⇒ 248 ≡ 112 ≡ 16 mod 35 ⇒ 242 × 248 = 2410 ≡ 16 × 16 ≡ 11 mod 35 ⇒ 24 × 2410 = 2411 ≡ (−11) × 11 ≡ −121 ≡ 19. Thus the encoding of X is 19. A translates as 111 mod 35. Thus the encoding of A is 01. M translates as 1311 mod 35. 132 ≡ −6 mod 35 ⇒ 134 ≡ (−6)2 ≡ 36 ≡ 1 mod 35 ⇒ 138 ≡ 1 mod 35 ⇒ 132 × 138 = 1310 ≡ (−6) × 1 ≡ −6 mod 35 ⇒ 1311 ≡ 13 × (−6) ≡ −78 ≡ −8 ≡ 27 mod 35. Thus the encoding of M is 27. The encrypted message reads as 10 19 01 27. 8) Note that 11 × 11 ≡ 1 mod 24. In the previous question with p = 5, q = 7 we have that (p − 1)(q − 1) = 24. Thus the decoding power is also 11. Check that the encrypted message is the correct one. Ans: We decode 10 19 01 27 using the decoding power which is coincidentally also 11. Translate 10 to 10d mod 35. (d = 11) 102 ≡ −5 mod 35 ⇒ 104 ≡ 25 ≡ −10 mod 35 ⇒ 108 ≡ (−10)2 ≡ −5 mod 35102 × 108 = 1010 ≡ (−5) × (−5) ≡ 25 ≡ −10 mod 35 ⇒ 1011 ≡ −100 ≡ 5 mod 35. Thus 10 is decrypted as 05 which is indeed correct. Compute 19d mod 35, 1d mod 35, 27d mod 35 and check that the results are 24, 01, 13 respectively. 3